Lineare Gleichungssysteme mit 4 Unbekannten (8. Klasse)

Lösen linearer Gleichungssysteme (LGS) durch Gleichsetzungsverfahren, Einsetzungsverfahren oder Additionsverfahren – geeignet ab Klasse 8

Kategorie―→ Gleichungen―→ Lineare Gleichungssysteme

Aufgabe

Löse die folgenden Gleichungssysteme mit einem Verfahren deiner Wahl:

$$\begin{array}[t]{rcrcrcrcr}4\,x & \hspace{-0.7em} + & \hspace{-0.7em} \,\,y& \hspace{-0.7em} & \hspace{-0.7em} & \hspace{-0.7em} - & \hspace{-0.7em} 7\,t & \hspace{-0.7em} = & \hspace{-0.7em} -25\\ & \hspace{-0.7em} & \hspace{-0.7em} \,y & \hspace{-0.7em} - & \hspace{-0.7em} 6\,z & \hspace{-0.7em} + & \hspace{-0.7em} \,\,t & \hspace{-0.7em} = & \hspace{-0.7em} -17\\ -5\,x & \hspace{-0.7em} - & \hspace{-0.7em} 2\,y & \hspace{-0.7em} - & \hspace{-0.7em} 6\,z & \hspace{-0.7em} + & \hspace{-0.7em} 5\,t & \hspace{-0.7em} = & \hspace{-0.7em} -16\\ 2\,x & \hspace{-0.7em} - & \hspace{-0.7em} 6\,y & \hspace{-0.7em} + & \hspace{-0.7em} \,\,z & \hspace{-0.7em} + & \hspace{-0.7em} 4\,t & \hspace{-0.7em} = & \hspace{-0.7em} 30\end{array}$$
$$\begin{array}[t]{rcrcrcrcr}-3\,x & \hspace{-0.7em} - & \hspace{-0.7em} 5\,y& \hspace{-0.7em} & \hspace{-0.7em} & \hspace{-0.7em} + & \hspace{-0.7em} 2\,t & \hspace{-0.7em} = & \hspace{-0.7em} 11\\ 3\,x & \hspace{-0.7em}- & \hspace{-0.7em} \,\,y & \hspace{-0.7em} + & \hspace{-0.7em} 4\,z & \hspace{-0.7em} + & \hspace{-0.7em} 6\,t & \hspace{-0.7em} = & \hspace{-0.7em} 15\\ 6\,x & \hspace{-0.7em} + & \hspace{-0.7em} 6\,y & \hspace{-0.7em}- & \hspace{-0.7em} \,\,z & \hspace{-0.7em} - & \hspace{-0.7em} 3\,t & \hspace{-0.7em} = & \hspace{-0.7em} -5\\ & \hspace{-0.7em} & \hspace{-0.7em} -2\,y & \hspace{-0.7em} + & \hspace{-0.7em} \,\,z & \hspace{-0.7em} + & \hspace{-0.7em} 7\,t & \hspace{-0.7em} = & \hspace{-0.7em} 37\end{array}$$
$$\begin{array}[t]{rcrcrcrcr}2\,x & \hspace{-0.7em} + & \hspace{-0.7em} 7\,y& \hspace{-0.7em} & \hspace{-0.7em} & \hspace{-0.7em} - & \hspace{-0.7em} 2\,t & \hspace{-0.7em} = & \hspace{-0.7em} 15\\ & \hspace{-0.7em} & \hspace{-0.7em} & \hspace{-0.7em} & \hspace{-0.7em} -4\,z & \hspace{-0.7em} - & \hspace{-0.7em} 2\,t & \hspace{-0.7em} = & \hspace{-0.7em} 10\\ 2\,x & \hspace{-0.7em} - & \hspace{-0.7em} 5\,y & \hspace{-0.7em} + & \hspace{-0.7em} 2\,z & \hspace{-0.7em} - & \hspace{-0.7em} 5\,t & \hspace{-0.7em} = & \hspace{-0.7em} -14\\ & \hspace{-0.7em} & \hspace{-0.7em} 2\,y & \hspace{-0.7em} + & \hspace{-0.7em} \,\,z& \hspace{-0.7em} & \hspace{-0.7em} & \hspace{-0.7em} = & \hspace{-0.7em} -2\end{array}$$
$$\begin{array}[t]{rcrcrcrcr}-3\,x & \hspace{-0.7em} + & \hspace{-0.7em} 6\,y& \hspace{-0.7em} & \hspace{-0.7em} & \hspace{-0.7em} + & \hspace{-0.7em} 2\,t & \hspace{-0.7em} = & \hspace{-0.7em} 24\\ -5\,x & \hspace{-0.7em} + & \hspace{-0.7em} 7\,y & \hspace{-0.7em} - & \hspace{-0.7em} 7\,z & \hspace{-0.7em} - & \hspace{-0.7em} 7\,t & \hspace{-0.7em} = & \hspace{-0.7em} 48\\ 7\,x & \hspace{-0.7em} - & \hspace{-0.7em} 6\,y & \hspace{-0.7em} + & \hspace{-0.7em} 6\,z & \hspace{-0.7em} + & \hspace{-0.7em} 5\,t & \hspace{-0.7em} = & \hspace{-0.7em} -52\\ 4\,x& \hspace{-0.7em} & \hspace{-0.7em} & \hspace{-0.7em} - & \hspace{-0.7em} 5\,z & \hspace{-0.7em} - & \hspace{-0.7em} 5\,t & \hspace{-0.7em} = & \hspace{-0.7em} -6\end{array}$$